We suspect that some additional information got lost on the way to the computer.
The arc length is the radius times the arc degree in radians
Arc length = pi*r*theta/180 = 17.76 units of length.
19.28
312 cm
(arc length)/circumference=(measure of central angle)/(360 degrees) (arc length)/(2pi*4756)=(45 degrees)/(360 degrees) (arc length)/(9512pi)=45/360 (arc length)=(9512pi)/8 (arc length)=1189pi, which is approximately 3735.3536651
find the arc length of minor arc 95 c= 18.84
It is: 72-lenghth of major arc = length of minor arc
I'm assuming that "c" is short for "circumference". The length of an arc is (circumference)*(360/angle). So the length of an arc in a circle with circumference length of 18.84 is 6782.4/angle, where the angle is measured in degrees.
5.23
The arc length is the radius times the arc degree in radians
13.08
Since the minor arc is 30 degrees, the major arc is 330 degrees (360 - 30). So we have: 330 degrees : arc length 10 30 degrees : arc length x 330/30 = 10/x 11/1 = 10/x x = 10/11 x = 0.9 approximately So the length of the minor arc is approximately 0.9 units.
Minor arc/Circumference = 150/360 Minor arc = 31.4*150/360 = 13.0833...
the measure of a minor arc equals the measure of the central angle that intercepts it.
Arc length = pi*r*theta/180 = 17.76 units of length.
6.28 cm.
17